Pressure Dependence of the Order-to-Disorder Transition in

Jan 13, 1998 - The pressure dependence of the order-to-disorder transition in a polystyrene/polyisoprene (PS/PI) (M = 17 000) and a polystyrene/poly(m...
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Macromolecules 1998, 31, 36-40

Pressure Dependence of the Order-to-Disorder Transition in Polystyrene/Polyisoprene and Polystyrene/Poly(methylphenylsiloxane) Diblock Copolymers B. Steinhoff, M. Ru 1 llmann, M. Wenzel, M. Junker, and I. Alig Deutsches Kunststoff-Institut, Schlossgartenstrasse 6, D-64289 Darmstadt, Germany

R. Oser and B. Stu 1 hn* Fakulta¨ t fu¨ r Physik, Hermann-Herder-Strasse 3, D-79104 Freiburg, Germany

G. Meier MPI Polymerforschung, P.O. Box 3148, D-55021 Mainz, Germany

O. Diat, P. Bo1 secke, and H. B. Stanley ESRF, B. P. 220, F-38043 Grenoble Cedex, France Received May 12, 1997; Revised Manuscript Received September 15, 1997X

ABSTRACT: The pressure dependence of the order-to-disorder transition in a polystyrene/polyisoprene (PS/PI) (M ) 17 000) and a polystyrene/poly(methylphenylsiloxane) (PS/PMPS) (M ) 29 600) diblock copolymer of symmetric composition has been studied using small-angle X-ray scattering. The orderdisorder transition is investigated with a temperature resolution of 0.1 K. The transition can be resolved in a two-step process with a roughening of the interface preceding the breakdown of the lamellar order. For both systems a pressure-induced ordering transition is observed at constant temperature. The application of small pressures leads to a decrease of the transition temperature for both systems. High pressure shows the opposite effect. The minimum transition temperature for the PS/PI is located around p ) 8 bar.

Introduction The ordering transition in block copolymers has been investigated in great detail in recent years.1,2 Much attention has been paid to the properties of symmetric diblock copolymers. The basic principles of their transition between the disordered and the ordered state are well understood in the framework of a mean field theory.3 More elaborate theory is able to take into account the effect of fluctuations.4 It then describes the ordering phenomenon as a fluctuation-induced firstorder phase transition. This picture has been confirmed in particular by scattering experiments.5,6 So far the influence of pressure on the phase state of a block copolymer was mostly ignored. Recent work, however, has shown that the thermotropic ordering transition of a polystyrene/polyisoprene diblock copolymer leads to an increase of the relative volume by 0.03%.7 These experiments were performed at atmospheric pressure. On the basis of the Clausius-Clapeyron equation it was concluded that the transition temperature TODT should decrease with the application of pressure. Subsequent experiments have found both a decrease8,9 and an increase of TODT with pressure. In particular for the PI/PS system in a pressure-dependent measurement, a volume change of similar magnitude but of opposite sign was observed.10 In this paper we present results which resolve this seeming contradiction. We have investigated the pressure dependence of the ordering transition of a poly* To whom correspondence should be addressed. X Abstract published in Advance ACS Abstracts, December 15, 1997.

styrene/polyisoprene (PS/PI) and a polystyrene/poly(methylphenylsiloxane) (PS/PMPS) diblock copolymer using small-angle X-ray scattering (SAXS) experiments. For both systems we find a pressure-induced transition from the ordered to the disordered state. We also determine the transition temperature of the PS/PI block copolymer in a wide regime of pressures, putting special emphasis on small pressures. As a result we find a decrease of TODT at small pressures. This trend is reversed in the high pressure regime p g 25 bar which was studied in ref 10. As it turns out it is not correct to extrapolate the results obtained at high pressures to the low-pressure regime. I. Experimental Method The PS/PI diblock copolymer was synthesized anionically using standard high vacuum procedures. The molecular weight of the polymer was M ) 17 000 g/mol; its volume fraction of polystyrene was f ) 0.49. The polydispersity Mw/ Mn was determined with gel permeation chromatography to be smaller than 1.04. The PS/PMPS diblock copolymer was similar as the one described in ref 11. Its molecular weight was M ) 29 600 g/mol, and the polystyrene volume fraction was f ) 0.56. Some of the SAXS experiments were carried out in a Kratky compact camera using slit collimation for pressures of 0 and 1 bar. The high-pressure measurements (1 bar f 500 bar ) were performed using the beamline ID2 of the ESRF (Grenoble, France). The scattered intensity was measured with a two-dimensional detector and averaged circularly. The sample is contained in a cylindrical volume with diamond windows. The sample thickness is 3 mm. Pressure is applied via an oilfilled presure line. The oil is strictly separated from the sample by a membrane (Kalrez, Dupont) which is installed in

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Macromolecules, Vol. 31, No. 1, 1998

Order-to-Disorder Transition 37

Figure 2. Details of the peak shape variation with temperature for the PS/PI diblock copolymer at 1 bar. Open symbols are the intensity at the maximum I(q*); filled symbols are the peak width ∆ as obtained from a fit of the individual scattering profiles. The errors for both quantities are smaller than the size of the symbol. The full lines show the two-step variation of both quantities (see text).

Figure 1. SAXS profiles obtained in pinhole geometry for the disordered (a) and the ordered (b) states of the PS/PI diblock copolymer. (a) T ) 403 K. For the sake of clarity not all measured points are shown. The full line is a fit of mean field theory. Systematic deviations are observed at large q. (b) T ) 358 K. The scattering profile in the ordered state exhibits three equally spaced maxima. The full lines are fits with a Gaussian. the media separator below the cell. The application of pressure is achieved by manual pumping. Fast pressure release is made possible by opening of an automatic valve. The typical time for the release of pressure is less than 0.1 s. Further details of the design of the pressure cell may be found elsewhere.12 The wavelengths used were λ ) 0.1542 nm (Kratky system) and λ ) 0.0989 nm (ESRF), respectively. The data were corrected for background scattering by subtracting the intensity of an empty container measurement. The Kratky data were desmeared using standard procedures13 to obtain the scattering cross section whereas the ESRF data were directly obtained in point collimation. Temperature was measured with a platinum resistor and controlled with a computer. The resulting fluctuations of T were smaller than (10 mK.

II. Results and Discussion Scattering experiments with X-rays provide a direct measure of the strength of concentration fluctuations at a wave vector q which is experimentally defined by the wavelength of the radiation and the scattering angle θ, q ) (4π/λ) sin θ. Figure 1 displays the SAXS profile (ESRF) of the diblock copolymer at p ) 1 bar and T ) 403 K (a) and T ) 358 K (b). At the lower temperature one observes a sharp peak at 0.362 nm-1. Two higher orders are clearly observed indicating a lamellar order with a period of 17.36 nm. The nonzero intensity of the second-order peak is a result of the slight asymmetry in the layer thickness of both components. The high-temperature profile shows only one broad peak with a significantly smaller intensity in its maximum which is characteristic of the disordered state. The full line in Figure 1a is a fit of the structure factor obtained in mean field theory3 modified to take the polydispersity of the sample into account.14 The resolution of the camera is convoluted with the theoretical

scattering curve. The parameters obtained from this fit are the radius of gyration of the block copolymer Rg ) 4.75 nm and the product of the Flory-Huggins parameter and the number of segments χN ) 9.8. The result provides a very good description of the experimental data although the temperature is only 0.8 K above the transition. The presence of concentration fluctuations in the sample does not significantly alter the shape of the scattering curve. Systematic deviations between the measured data and the theoretical curve appear at large q where the scattering data are sensitive to short scale variations of concentration. It has been shown previously6 that the change in the intensity I(q*) as well as in the full width at halfmaximum (∆ ) of the first maximum may be used to determine the transition temperature TODT. The latter is particularly sensitive to the breakdown of the lamellar structure. The disappearance of the higher order maxima may be taken as an additional indication for the transition from the ordered to the disordered state. It is, however, more difficult to detect experimentally. A. Thermotropic Transition at p ) 1 bar. The order-to-disorder transition shows up as a discontinuous decrease in the scattered intensity at a wave vector value q* which is directly related to the radius of gyration of the block copolymer q*)1.946/Rg.15 Experimentally q* is the wave vector of maximum intensity (see Figure 1). As an example for the determination of the transition temperature TODT we show in Figure 2 the change of I(q*) and ∆ with T. The pressure for this measurement is p ) 1 bar. The sample is heated at an effective rate of 0.08-0.1 K/min. This slow variation of T is necessary for the sample to equilibrate. It is known, that the glass transition temperature is raised under pressure. For PS this increase is dTg/dp ) 0.032 K/bar.16 Within the range of our experiment this will account for less than 16 K, and Tg is therefore well below TODT for all pressures. The registration of a scattering profile takes 30 s. We are therefore able to determine the variation of the scattering profile with extremely high temperature resolution. In between the measurements the X-ray beam is shut off in order to avoid degradation of the sample. Figure 2 shows that the sharp transition in

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the intensity I(q*) and the full width at half-maximum ∆ that is usually observed in experiments with lower temperature resolution, does indeed consist of a two step process. During heating one finds a first drop of I(q*) which is accompanied by only a small increase in ∆. Both findings are in accordance with the assumption of a roughening of the interphase between PS and PI. A second step then finally leads to the disordered state as indicated by the strong increase in ∆ and a further loss of intensity. The temperature dependence of both properties of the peak is empirically well described by the sum of two subsequent tanh profiles:

∆(T) ) D0 +

(

) (

)

D1 T - T1 D2 T - T2 1 + tanh + 1 + tanh 2 w1 2 w2

D0 is the initial value of ∆ at low T, and D1 and D2 denote the steps of increase at the temperatures T1 and T2. The width of the transition is described by w1 and w2. An analogous form describes the temperature dependence of I(q*). Quite similar results for T1 and T2 are obtained by a numerical differentiation of the measured ∆(T) and I(q*,T). Repeated measurements with fresh samples were used to assure the reproducibility of this method. Not shown in the figure is the variation of q* with T. It is seen in Figure 1 that q* in the ordered state is smaller than that in the disordered state which is taken as an indication for chain stretching in the ordering process. The variation, however, is small (